The capacitance of a capacitor including a dielectric material is given by the equation:
(a)
Determine the following variables and state an appropriate unit for each:
(i) ε
[1]
(ii) A
[1]
(iii) d
[1]
Question 1b
Marks: 4
A student makes a parallel-plate capacitor of capacitance 78 nF from aluminium foil and plastic film by inserting one sheet of plastic film between two sheets of aluminium foil.
The aluminium foil has an area of 0.28 m2 and the plastic film has a permittivity of 2.5 × 10–11 C2 N–1 m–2.
(b)
Calculate the thickness of the plastic film.
[4]
Question 1c
Marks: 4
The student uses a switch to charge and discharge the capacitor in the circuit shown. The ammeter is ideal.
The time constant of the capacitor is 0.24 ms.
(c)
Show that the resistance of resistor R is 3.1 kΩ.
[4]
Question 1d
Marks: 3
The emf of the battery is 15 V.
(d)
Calculate the initial charge of the capacitor before it is discharged.
[3]
Question 2a
Marks: 3
A defibrillator device sends an impulse of electrical energy to maintain a regular heartbeat in a person. The device is powered by an alternating current (ac) supply connected to a step-up transformer that charges a capacitor of capacitance 20 μF. The voltage in the circuit is 3000 V.
(a)
Calculate the maximum energy stored in the capacitor.
[3]
Question 2b
Marks: 2
(b)
Calculate the maximum charge, q stored in the capacitor.
[2]
Question 2c
Marks: 1
The current in the circuit passes through the diode from left to right following the direction of the triangle symbol.
(c)
Identify, by drawing a +, the positive plate of the capacitor.
[1]
Question 2d
Marks: 1
The switch is moved to position B.
(d)
State what happens to the energy stored in the capacitor when the switch is moved to position B.
[1]
Question 3a
Marks: 1
A circuit containing a power supply V, a resistor R and a capacitor C is constructed in a laboratory.
(a)
Define the meaning of the time constant for a discharging capacitor.
[1]
Question 3b
Marks: 2
The resistor, R in the experiment is fixed at a resistance of 100 Ω and the capacitor, C has a capacitance of 25 μF and is discharging.
(b)
Calculate the time constant of the circuit.
[2]
Question 3c
Marks: 2
A different resistor and capacitor are now added to the circuit from (a). The capacitor is charging.
(c)
Use the graph to state the value of the time constant for this new circuit.
[2]
Question 3d
Marks: 1
An additional capacitor C2 is added in parallel to the circuit.
(d)
State the effect on the charge stored in the circuit after adding this additional capacitor.
[1]
Question 4a
Marks: 1
(a)
Define capacitance.
[1]
Question 4b
Marks: 3
Three capacitors are connected to a power supply.
(b)
Calculate the combined capacitance in this circuit.
[3]
Question 4c
Marks: 2
The capacitors in part (b) are arranged into a parallel combination.
(c)
Determine the new total capacitance of the circuit.
[2]
Question 4d
Marks: 5
A parallel plate capacitor has plates of area 0.680 m2, which are separated by a distance of 5.50 mm in a vacuum. The capacitor is connected to a dc source of potential difference 8.00 kV. :
(d)
Calculate
(i)
The capacitance of the capacitor.
[2]
(ii)
The charge on one of the plates.
[3]
Question 5a
Marks: 4
The diagram shows two capacitors, X and Y, connected in a series circuit.
(a)
For the time after the switch is closed and when charge has stopped moving, write equations which would determine:
(i)
The initial and final values of charge on the capacitors in terms of q.
[1]
(ii)
The ratio of the final charges on the two capacitors, in terms of q and C.
[3]
Question 5b
Marks: 3
Capacitor X has capacitance of 5.40 μF and has initially been charged by connecting it to a source of emf 12.0 V.
(b)
Using the equations from part (a) or otherwise, calculate the charge
(i)
Initially on capacitor X.
[2]
(ii)
Finally the total on both capacitors X and Y.
[1]
Question 5c
Marks: 3
Capacitor Y has capacitance CY and is initially uncharged.
(c)
Using the two equations derived in part (a), find an expression in terms of q and C to determine the final values of the charges on each capacitor.
[3]
Question 5d
Marks: 5
The value of CY = 16.5 µF.
(d)
Use this value to calculate the magnitudes of both charges, qX and qY after the switch has closed and charge has stopped moving.
format('truetype')%3Bfont-weight%3Anormal%3Bfont-style%3Anormal%3B%7D%3C%2Fstyle%3E%3C%2Fdefs%3E%3Ctext%20font-family%3D%22Times%20New%20Roman%22%20font-size%3D%2218%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%226.5%22%20y%3D%2230%22%3EC%3C%2Ftext%3E%3Ctext%20font-family%3D%22math17f39f8317fbdb1988ef4c628eb%22%20font-size%3D%2216%22%20text-anchor%3D%22middle%22%20x%3D%2221.5%22%20y%3D%2230%22%3E%3D%3C%2Ftext%3E%3Ctext%20font-family%3D%22Times%20New%20Roman%22%20font-size%3D%2218%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%2238.5%22%20y%3D%2230%22%3E%26%23x3B5%3B%3C%2Ftext%3E%3Cline%20stroke%3D%22%23000000%22%20stroke-linecap%3D%22square%22%20stroke-width%3D%221%22%20x1%3D%2245.5%22%20x2%3D%2262.5%22%20y1%3D%2223.5%22%20y2%3D%2223.5%22%2F%3E%3Ctext%20font-family%3D%22Times%20New%20Roman%22%20font-size%3D%2218%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%2253.5%22%20y%3D%2216%22%3EA%3C%2Ftext%3E%3Ctext%20font-family%3D%22Times%20New%20Roman%22%20font-size%3D%2218%22%20font-style%3D%22italic%22%20text-anchor%3D%22middle%22%20x%3D%2253.5%22%20y%3D%2241%22%3Ed%3C%2Ftext%3E%3C%2Fsvg%3E)
